What transformation of the parent function f(2) is made to get f(x) - 32 . O...
9. Graph the function defined by f(x) = 2 x +1 -3. Parent function: f(x) = x 1. f(x) = 2x +1 -3 Shift the graph to the left 1 unit 2. f(x) = 2 x +1 -3 Apply a vertical stretch multiply the y-values by 2) 3. f(x) = 2x+1-3 Shift the graph downward 3 units. 10. Graph the function defined by = (x) = -V3- x. Parent function y = x
Directions: Using the graph of each function, identify the parent function, then write an equation for the function under each transformation. 11. a) Parent Function: b) Translate 4 units down and 3 units left c) Vertically stretch by a factor of 2, then translate 5 units left: 12 a) Parent Function: b) Translate 3 units up and 8 units right: c) Horizontally compress by a factor of %, then reflect in the y-axis a) Parent Function: 13. b) Horizontally stretch...
3. Find the domain of the function f(x)--2logs (x +3) - 2 Was this domain difficult to find? If so, why? If not, why might someone else find it difficult? List the transformations in their correct order, starting with the parent function a) Parent function: b) Frist transformation c) Second transformation d) Third transformation e) Fourth transformation
3. Find the domain of the function f(x)--2logs (x +3) - 2 Was this domain difficult to find? If so, why? If not,...
Type the correct answer in each box. Use numerals instead of words. Function gis a transformation of function f. y A -6 -5 -4 co- NS -1 3 4 6 On -2 -3 4 -5 What is the equation of function g? g(x) = f(x) Reset Next
15 f(x) = 2* Which transformation is needed to graph the function f(x) = 15 2* x2 Choose the correct answer below. O A. The graph of y = x should be horizontally stretched by a factor of 15 2 OB. The graph of y = x should be vertically stretched by a factor of 15 2. OC. The graph of y = x should be horizontally compressed by a factor of 15 2 OD. The graph of y=x* should...
Given the function f(x) = -2x? +12x - 5, describe the transformations compared to the parent function y = x2. A. f(x) is shifted 3 right, up 13 and then reflected over the x-axis. B. f(x) is shifted 3 left, down 13 and then reflected over the x-axis. C. f(x) is shifted 3 right, down 13 and then reflected over the x-axis. D. f(x) is shifted 3 left, up 13 and then reflected over the x-axis.
(3) (3 points each) Given the parent function f(x) = 1, write down the function whose graph satisfies the given description in each case: (a) The graph of f shifted 0.8 units up and 3 units to the right. (b) The graph of f shifted 2 units to the left and then reflected through the x-axis.
The transformation of a function f(x) into a function g(x) is given by g(x) = Af(Bx + H) + K. where the constants • A vertically scales the function. (negative A reflects the function about the x-axis.) • B horizontally scales the function. (negative B reflects the function about the y-axis.) • H horizontally shifts the function. • K vertically shifts the function. Transform f(z) into g(x) where the transformation is g(x) = -f(x) The function f(s) is shown below...
Consider the function f (x, y)=6-32 -32 (a) Determine the level curves for the surface when z 0,3, 6. Sketch these three level curves in the ry plane. (b) Determine the cross-sectional curves of the surface in the rz plane and in the yz plane. Sketch these two cross-sectional curves. (c) Sketch the surface z f(x, y) (d) What is the maximal domain and range of f? (e) Evaluate the double integral f(ar, y) da dy
Consider the function f...
2. State the transformations that were applied to the parent function y = f(x) to obtain y 3f(-0.5(x - 4)) [4] 7